Volume rigidity at ideal points of the character variety of hyperbolic 3-manifolds

Abstract

Given the fundamental group of a finite-volume complete hyperbolic 3-manifold M, it is possible to associate to any representation : → Isom(H3) a numerical invariant called volume. This invariant is bounded by the hyperbolic volume of M and satisfies a rigidity condition: if the volume of is maximal, then must be conjugated to the holonomy of the hyperbolic structure of M. This paper generalizes this rigidity result by showing that if a sequence of representations of into Isom(H3) satisfies n ∞ Vol(n) = Vol(M), then there must exist a sequence of elements gn ∈ Isom(H3) such that the representations gn n gn-1 converge to the holonomy of M. In particular if the sequence n converges to an ideal point of the character variety, then the sequence of volumes must stay away from the maximum. We conclude by generalizing the result to the case of k-manifolds and representations in Isom( Hm), where m≥ k.